Missing multiplication symbol: Difference between revisions
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When writing a division on one line, does an implied multiplication bind more tightly than an explicit one?<ref>[https://twitter.com/christianp/status/1320650593241866241 Twitter thread by Christian Lawson-Perfect]</ref> | When writing a division on one line, does an implied multiplication bind more tightly than an explicit one?<ref>[https://twitter.com/christianp/status/1320650593241866241 Twitter thread by Christian Lawson-Perfect]</ref> | ||
Does \(a/bc = a | Does \(a/bc = \frac{a}{bc}\) or \(\frac{a}{b}c\)? | ||
There seems to be an unwritten rule "juxtaposition is stickier". | There seems to be an unwritten rule "juxtaposition is stickier". | ||
But that might not apply when there are numbers involved: almost everyone would interpret \(2/3x\) as \(\frac{2}{3}x\) instead of \(\frac{2}{3x}\) | |||
==References== | ==References== | ||
<references/> | <references/> |
Revision as of 09:16, 2 July 2021
It's common to omit a multiplication symbol:
\(ab = a \times b\)
But sometimes it's not as clear:
Does \( a(b+1) = a \times (b+1)\), or is \(a\) a function?
When writing a division on one line, does an implied multiplication bind more tightly than an explicit one?[1]
Does \(a/bc = \frac{a}{bc}\) or \(\frac{a}{b}c\)?
There seems to be an unwritten rule "juxtaposition is stickier".
But that might not apply when there are numbers involved: almost everyone would interpret \(2/3x\) as \(\frac{2}{3}x\) instead of \(\frac{2}{3x}\)